How fast is the linear chain trick? A rigorous analysis in the context of behavioral epidemiology
From MaRDI portal
Publication:2047782
DOI10.3934/mbe.2020273zbMath1470.92277OpenAlexW3044565248WikidataQ101116875 ScholiaQ101116875MaRDI QIDQ2047782
Giulia Gava, Alessia Andò, Dimitri Breda
Publication date: 4 August 2021
Published in: Mathematical Biosciences and Engineering (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.3934/mbe.2020273
stability analysisdistributed delaybehavioral epidemiologylinear chain trickSIR models with vaccination
Cites Work
- Statistical physics of vaccination
- Discrete or distributed delay? Effects on stability of population growth
- Global stability of an SIR epidemic model with information dependent vaccination
- On the use of reducible-functional differential equations in biological models
- Discrete delay, distributed delay and stability switches
- Reductibilite des systèmes hereditaires
- Mixed pulse vaccination strategy in epidemic model with realistically distributed infectious and latent times.
- Finite dimensional state representation of linear and nonlinear delay systems
- Information-related changes in contact patterns may trigger oscillations in the endemic prevalence of infectious diseases
- Hopf bifurcation in a structured population model for the sexual phase of monogonont rotifers
- Vaccinating behaviour, information, and the dynamics of SIR vaccine preventable diseases
- Effect of seasonality on the dynamics of an imitation-based vaccination model with public health intervention
- Modeling the Interplay Between Human Behavior and the Spread of Infectious Diseases
- Approximation of Eigenvalues of Evolution Operators for Linear Retarded Functional Differential Equations
- Stability of Linear Delay Differential Equations
- A numerical approach for investigating the stability of equilibria for structured population models
- Computing the Eigenvalues of Realistic Daphnia Models by Pseudospectral Methods
- Pseudospectral Discretization of Nonlinear Delay Equations: New Prospects for Numerical Bifurcation Analysis
- Stability and Bifurcation Analysis of Volterra Functional Equations in the Light of Suns and Stars
- A practical approach to R0 in continuous‐time ecological models
- Pseudospectral Differencing Methods for Characteristic Roots of Delay Differential Equations
- Approximation of Eigenvalues of Evolution Operators for Linear Renewal Equations
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
This page was built for publication: How fast is the linear chain trick? A rigorous analysis in the context of behavioral epidemiology
